We construct limiting and small sample distributions of maximum likelihoodestimators (mle) from the property that they satisfy the first order condition (foc). The foc relates the mle of the analyzed model to the mle of an encompassing model and shows that the mle of the analyzed model is a realization from the limiting or small sample distribution of the mle of the encompassing model given that the foc holds. We can thus use the unique conditional (limiting or small sample) density of the mle of the encompassing model given that the foc holds to construct the limiting or small sample density/distribution of the mle of the analyzed model. To proof the validity of this approach and thus of the concept of an unique conditional density, we use...
We show that three convenient statistical properties that are known to hold forthe linear model with...
We outline how modern likelihood theory, which provides essentially exact inferences in a variety of...
. We propose estimating density functions by means of a constrained optimization problem whose crite...
textabstractWe construct limiting and small sample distributions of maximum likelihood estimators (...
The fiducial is not unique in general, but we prove that in a restricted class of models it is uniqu...
Maximum likelihood approach for independent but not identically distributed observations is studied....
A famous characterization theorem due to C.F. Gauss states that the maximum likelihood estimator (ML...
In the analysis of contingency tables, often one faces two difficult criteria: sampled and target po...
In this technical report, we consider conditional density estimation with a maximum like-lihood appr...
In this article, the principle of maximum likelihood estimation (MLE) is introduced. It is illustrat...
For a given prior density, we minimize the Shannon Mutual Information between a parameter and the da...
AbstractThe theory of maximum probability estimation is predominantly asymptotic. In this paper it i...
Maximum likelihood is by far the most pop-ular general method of estimation. Its wide-spread accepta...
Abstract: This paper studies a general problem of making inferences for functions of two sets of par...
We study nonparametric estimation for current status data with competing risks. Our main interest is...
We show that three convenient statistical properties that are known to hold forthe linear model with...
We outline how modern likelihood theory, which provides essentially exact inferences in a variety of...
. We propose estimating density functions by means of a constrained optimization problem whose crite...
textabstractWe construct limiting and small sample distributions of maximum likelihood estimators (...
The fiducial is not unique in general, but we prove that in a restricted class of models it is uniqu...
Maximum likelihood approach for independent but not identically distributed observations is studied....
A famous characterization theorem due to C.F. Gauss states that the maximum likelihood estimator (ML...
In the analysis of contingency tables, often one faces two difficult criteria: sampled and target po...
In this technical report, we consider conditional density estimation with a maximum like-lihood appr...
In this article, the principle of maximum likelihood estimation (MLE) is introduced. It is illustrat...
For a given prior density, we minimize the Shannon Mutual Information between a parameter and the da...
AbstractThe theory of maximum probability estimation is predominantly asymptotic. In this paper it i...
Maximum likelihood is by far the most pop-ular general method of estimation. Its wide-spread accepta...
Abstract: This paper studies a general problem of making inferences for functions of two sets of par...
We study nonparametric estimation for current status data with competing risks. Our main interest is...
We show that three convenient statistical properties that are known to hold forthe linear model with...
We outline how modern likelihood theory, which provides essentially exact inferences in a variety of...
. We propose estimating density functions by means of a constrained optimization problem whose crite...